Subharmonic solutions of first-order Hamiltonian systems
The aim of this article is to study subharmonic solutions of superquadratic and asymptotically (constant) linear nonautonomous Hamiltonian systems in R2n{{\mathbb{R}}}^{2n} respectively, and to improve the results in Professor Liu’s [Subharmonic solutions of Hamiltonian systems, Nonlinear Anal. 42 (...
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| Format: | Article |
| Language: | English |
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De Gruyter
2025-03-01
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| Series: | Advances in Nonlinear Analysis |
| Subjects: | |
| Online Access: | https://doi.org/10.1515/anona-2025-0074 |
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| Summary: | The aim of this article is to study subharmonic solutions of superquadratic and asymptotically (constant) linear nonautonomous Hamiltonian systems in R2n{{\mathbb{R}}}^{2n} respectively, and to improve the results in Professor Liu’s [Subharmonic solutions of Hamiltonian systems, Nonlinear Anal. 42 (2000), no. 2, 185–198, Ser. A: Theory Methods]. For the TT-periodic Hamiltonian system, we show that for each integer j≥1j\ge 1, there exists a nonconstant jTjT-periodic solution xj{x}_{j} such that xj{x}_{j} and xpj{x}_{pj} (p∈Np\in {\mathbb{N}}) are geometrically distinct provided p>2np\gt 2n; for n=1n=1, xj{x}_{j} and xpj{x}_{pj} (p∈Np\in {\mathbb{N}}) are geometrically distinct provided p>1p\gt 1; if xj{x}_{j} is nondegenerate, then xj{x}_{j} and xpj{x}_{pj} (p∈Np\in {\mathbb{N}}) are geometrically distinct provided p>1p\gt 1. |
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| ISSN: | 2191-950X |